Cylspherinder (EntityTopic, 13)

From Hi.gher. Space

(Difference between revisions)

Latest revision as of 22:58, 11 February 2014

A cylspherinder is the Cartesian product of a sphere and a circle. It is the expanded rotatope of the torisphere and spheritorus.

Equations

Variables:

a ⇒ radius of the sphere
b ⇒ radius of the circle

The hypervolumes of a cylspherinder are given by:

Unknown

Rolling

The cylspherinder will always roll when placed on a surface. If it rests on one of its tera, it can cover the space of a line. If it rests on its other teron, it can cover the space of a plane.

Notable Pentashapes
Flat:	pyroteron • aeroteron • geoteron
Curved:	tritorus • pentasphere • glone • cylspherinder • tesserinder

31. 41 Glominder	32. 32 Cylspherinder	33. 311 Cubspherinder
List of tapertopes

13a. ((II)I)II Cubtorinder	13b. (((II)I)II) Toracubtorinder	14a. (III)(II) Cylspherinder	14b. ((III)(II)) Cylspherintigroid	15a. ((II)I)(II) Cyltorinder	15b. (((II)I)(II)) Cyltorintigroid
List of toratopes

?. ? ?	?. [(II)(III)] Cylspherinder	?. ? ?
List of bracketopes

Cylspherinder
No image
Net space:	5
Bounding space:	5
Elements:	2, 1, 0, 0, 0
Symmetry group:	Unknown
SSCN:	[(xy)(zwφ)]
SSC2:	T2xT3
Circular packing value:	Unknown
Square packing value:	Unknown
[ Tapertope ]
Order:	2, 0
Notation:	32
Index:	32
[ Toratope ]
Expanded rotatope:	32
Notation:	(III)(II)
Index:	14a
[ Bracketope ]
Index:	?
Bracket notation:	N/A

@@ Line 1: / Line 1: @@
-{{Shape
+<[#ontology [kind topic] [cats 5D Tapertope Toratope Bracketope Curved]]>
-| attrib=strange
+{{STS Shape
-| name=Culspherinder
+| name=Cylspherinder
 | dim=5
-| elements=?, ?, ?, ?, ?
+| elements=2, 1, 0, 0, 0
 | genus=0
-| 20=SSC
 | ssc=[(xy)(zwφ)]
-| rns=32 (xyz)(wφ)
+| ssc2=T2xT3
-| bracket=[xyz]
+| extra={{STS Tapertope
-| rot_i=74
+| order=2, 0
-| bra_i=169
+| notation=32
-}}
+| index=32
+}}{{STS Toratope
-A '''cylspherinder''' is the [[Cartesian product]] of a [[sphere]] and a [[circle]].
+| expand=[[Cylspherinder|32]]
+| notation=(III)(II)
+| index=14a
+}}{{STS Bracketope
+| index=?
+}}}}
+A '''cylspherinder''' is the [[Cartesian product]] of a [[sphere]] and a [[circle]]. It is the [[expanded rotatope]] of the [[torisphere]] and [[spheritorus]].
 == Equations ==
@@ Line 27: / Line 32: @@
 {{Pentashapes}}
-{{Rotope Nav|73|74|75|(((III)I)I)<br>Toraspherindric torus|(III)(II)<br>Cylspherinder|((III)(II))<br>Cylspherintigroid|tera}}
+{{Tapertope Nav|31|32|33|41<br>Glominder|32<br>Cylspherinder|311<br>Cubspherinder|tera}}
-{{Bracketope Nav|168|169|170|[(xy)(<zw>φ)]<br>''Unknown shape''|[(xy)(zwφ)]<br>Cylspherinder|<[xy][zwφ]><br>''Unknown shape''|tera}}
+{{Toratope Nav A|13|14|15|((II)I)II<br>Cubtorinder|(((II)I)II)<br>Toracubtorinder|(III)(II)<br>Cylspherinder|((III)(II))<br>Cylspherintigroid|((II)I)(II)<br>Cyltorinder|(((II)I)(II))<br>Cyltorintigroid|tera}}
+{{Bracketope Nav|?|?|?|?<br>?|[(II)(III)]<br>Cylspherinder|?<br>?|tera}}